What is the work done in this case?

1. The problem statement, all variables and given/known data
A car of mass 1000 Kg moves with velocity 2 m/s , the brakes are applied to stop the car after 2 sec . Calculate the work done by the brakes.

You said that the magnitude of the force is negative, but that is untrue! The information that the force is opposite the displacement is already in the cosine term, putting the minus in twice is a mistake. :)

Either remember the vector formula, or the one with the absolute values to help avoid the confusion!

Another way of approaching the problem would be to use the work energy theorem which states that the work performed on an object is equal to the change in its kinetic energy. In this case, the final kinetic energy is 0, and the initial kinetic energy is 2000 joules. The work equals the final kinetic energy minus the initial kinetic energy, which is -2000 joules.

In its general form, when no other forces are present but the one doing work, the work energy theorem states:
[tex]W=\Delta K = \frac{1}{2}mv_f^2-\frac{1}{2}mv_i^2[/tex]

You said that the magnitude of the force is negative, but that is untrue! The information that the force is opposite the displacement is already in the cosine term, putting the minus in twice is a mistake. :)

Great!
How bout the negative acceleration ?How can i consider it in the problem?
Do u mean that we just use the magnitude of force (and although it is negative we just use its magnitude)?

Great!
How bout the negative acceleration ?How can i consider it in the problem?
Do u mean that we just use the magnitude of force (and although it is negative we just use its magnitude)?

Exactly. :) Whether the force is negative or positive (Along or opposite the displacement is what matters, not your coordinate system!), is expressed in the formula in the cosine of the angle.
The magnitude of a vector can only ever be a positive quantity, remember that, and you will avoid a lot of confusion.